Answer:
[tex]x=7\cos t, y=5\sin t\text{ for }0\le t<2\pi[/tex]
Step-by-step explanation:
The parametrization of an ellipse center at origin and counter-clockwise is given by the formulas:
[tex]x=a\cos t, y=b\sin t\text{ for }0\le t<2\pi[/tex]
Where “a” is the radius of the major axis along the x-axis and “b” is the radius of the minor axis along the y-axis. Since the major diameter along the x-axis is 14 then its radius is its half, thus a=7. Similarly, since the minor diameter along the y-axis is 10, then its radius is half of it, thus b=5
Therefore, the parametric equations for the ellipse become:
[tex]x=7\cos t, y=5\sin t\text{ for }0\le t<2\pi[/tex]
Notice at t=0 we get:
[tex]x=7\cos(0) =7, y=5\sin(0)=0[/tex]
which satisfies that the parametrization at t=0 makes the point (7,0)
